Stability beyond Bounded Differences: Sharp Generalization Bounds under Finite Lp Moments

Abstract

While algorithmic stability is a central tool for understanding generalization of learning algorithms, existing high-probability guarantees typically rely on uniform boundedness or sub-Gaussian/sub-Weibull tail assumptions, which can be overly restrictive for modern settings with heavy-tailed or unbounded losses. We develop a stability-based framework that requires only a finite Lp moment condition. Our first contribution is sharp concentration inequalities for functions of independent random variables under Lp constraints, extending McDiarmid's bounded-differences techniques beyond the classical regime. Leveraging these results, we derive sharp high-probability generalization bounds across a range of learning paradigms, including empirical risk minimization, transductive regression, and meta-learning. These guarantees show that Lp stability suffices for robust generalization even when boundedness fails, substantially weakening the standard assumptions in the stability literature.